脉冲时滞中立双曲型方程组的振动性

数学物理学报 ›› 2016, Vol. 36 ›› Issue (3): 462-472.

脉冲时滞中立双曲型方程组的振动性

马晴霞^1,2, 刘安平²

1 中国科学院武汉物理与数学研究所武汉 430071;
2 中国地质大学(武汉)数学与物理学院武汉 430074

收稿日期:2015-09-21 修回日期:2016-04-12 出版日期:2016-06-26 发布日期:2016-06-26
作者简介:马晴霞,maqx@163.com;刘安平,wh_apliu@sina.com
基金资助:
国家自然科学基金（11201436）和中国地质大学（武汉）生物地质和环境地质重点实验室基金资助

Oscillation of Neutral Impulsive Hyperbolic Systems with Deviating Arguments

Ma Qingxia^1,2, Liu Anping²

1 Wuhan Institute of Physics and Mathematics, Chinese Academy of Sciences, Wuhan 430071;
2 School of Mathematics and Physics, China University of Geosciences (Wuhan), Wuhan 430074

Received:2015-09-21 Revised:2016-04-12 Online:2016-06-26 Published:2016-06-26
Supported by:
Supported by the NSFC (11201436) and the State Key Laboratory of Biogeology and Environmental Gelogy, China University of Geosciences (Wuhan)

摘要/Abstract

摘要：

研究一类非线性脉冲时滞双曲型方程组在Robin以及Dirichlet边界条件下的振动性质. 利用广义的Riccati变换、平均值方法及不等式技巧，获得了方程组在两类边界条件下振动的充分条件，并给出了应用实例用以检验结论的有效性.

关键词: 非线性, 脉冲, 时滞, 偏微分方程组, 振动

Abstract:

Oscillatory properties of systems of neutral type impulsive hyperbolic equations with several deviating arguments under the Robin boundary condition and the Dirichlet boundary condition are investigated, and several new sufficient conditions for oscillation are presented. The main results are illustrated by one example.

Key words: Nonlinear, Impulsive, Delay, Partial differential systems, Oscillation

中图分类号:

O175.4

马晴霞, 刘安平. 脉冲时滞中立双曲型方程组的振动性[J]. 数学物理学报, 2016, 36(3): 462-472.

Ma Qingxia, Liu Anping. Oscillation of Neutral Impulsive Hyperbolic Systems with Deviating Arguments[J]. Acta mathematica scientia,Series A, 2016, 36(3): 462-472.

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